How do you solve #x^3-x=1#?
2 Answers
See below.
Explanation:
For my approach, I will be using a graphical interpretation.
You can rewrite the equation as
Then graph the following:
graph{x^3 - x - 1 [-10, 10, -5, 5]}
Click on where the graph intersects the x-axis. This point should be (1.325, 0). Therefore, the answer is
Use Cardano's method to find real root:
#x_1 = 1/3(root(3)((27+3sqrt(69))/2)+root(3)((27-3sqrt(69))/2))#
#color(white)(x_1) ~~ 1.324717957#
and related complex roots.
Explanation:
Given:
#x^3-x=1#
Subtract
#x^3-x-1 = 0#
Discriminant
The discriminant
#Delta = b^2c^2-4ac^3-4b^3d-27a^2d^2+18abcd#
In our example,
#Delta = 0+4+0-27+0 = -23#
Since
Cardano's method
Let
Then our equation becomes:
#(u+v)^3-(u+v)-1 = 0#
Multiplying out and rearranging a little:
#u^3+v^3+(3uv-1)(u+v)-1 = 0#
Add the constraint
#u^3+1/(27u^3)-1 = 0#
Multiply through by
#27(u^3)^2-27(u^3)+1 = 0#
Using the quadratic formula, we find:
#u^3 = (27+-sqrt((-27)^2-4(27)(1)))/(2*27)#
#color(white)(u^3) = (27+-sqrt(729-108))/54#
#color(white)(u^3) = (27+-sqrt(621))/54#
#color(white)(u^3) = (27+-3sqrt(69))/54#
Note that these values are both real and the derivation was symmetrical in
#x_1 = root(3)((27+3sqrt(69))/54)+root(3)((27-3sqrt(69))/54)#
#color(white)(x_1) = 1/3(root(3)((27+3sqrt(69))/2)+root(3)((27-3sqrt(69))/2))#
#color(white)(x_1) ~~ 1.324717957#
The complex roots are given by multiplying
#x_2 = 1/3(omega root(3)((27+3sqrt(69))/2)+omega^2 root(3)((27-3sqrt(69))/2))#
#x_3 = 1/3(omega^2 root(3)((27+3sqrt(69))/2)+omega root(3)((27-3sqrt(69))/2))#
